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Zapiski Nauchnykh Seminarov LOMI, 1988, Volume 168, Pages 11–22
(Mi znsl5577)
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This article is cited in 2 scientific papers (total in 2 papers)
On the period length of the continued fraction expansion of quadratic irrationalities and class numbers of real quadratic fields. II
E. P. Golubeva
Abstract:
It is proved that the relation $h(d)=2$ is valid for at least $Cx^{1/2}\log^{-2}x$ values of $d\leq x$. Here $h(d)$ is the number of the classes of binary quadratic forms of determinant $d$, while $C>0$ is a constant. Further, it is shown that for almost all primes $p\equiv3\,(\operatorname{mod}4)$,
$p\leq x$, for $\varepsilon(p)$, a fundamental unit of field $\mathbb{Q}(\sqrt{p})$ and $\ell(p)$, the length of the period of the continued fraction expansion of $\sqrt{p}$, we have estimates $\varepsilon(p)\gg p^2\log^{-c}p$, $\ell(p)\gg\log p$, which improve a result of Hooley (J. Reine Angew. Math., Vol. 353, pp. 98–131, 1984; MR 86d:11032). In addition, a generalization is given to composite discriminants of the Hirzebruch–Zagier formula, relating $h(-p)$, $p\equiv3\,(\operatorname{mod}4)$, with the continued fraction expansion of $\sqrt{p}$ (Asterisque, no. 24–25, pp. 81–97, 1975; MR 51 10293).
Citation:
E. P. Golubeva, “On the period length of the continued fraction expansion of quadratic irrationalities and class numbers of real quadratic fields. II”, Analytical theory of numbers and theory of functions. Part 9, Zap. Nauchn. Sem. LOMI, 168, "Nauka", Leningrad. Otdel., Leningrad, 1988, 11–22
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https://www.mathnet.ru/eng/znsl5577 https://www.mathnet.ru/eng/znsl/v168/p11
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